Delay-dependent exponential stability criteria for nonlinear time-varying discrete systems with multiple time delays

This paper addresses the exponential stability and estimates the stability degree of discrete systems with a time-varyiny delay and uncertainties. On the basis of the Lyapunov stability theorem together with the improved Razumikhin type theorem and norm techniques, several new delay-independent crit

This paper proposes an approach for the robust stability of uncertain systems with interval time-varying delay. The key features of the approach include the introduction of uncorrelated augmented matrix items into the Lyapunov functional and the use of a tighter bounding technology. Unlike existing

This paper deals with the class of nonlinear discrete-time systems with varying time delay. The problems of stability and stabilizability for this class of systems are considered. Given an upper bound and a lower bound on the time-varying delay, sufficient conditions for checking the stability of th

In this paper, an easy-to-check exponential stability criterion for a class of uncertain retarded systems with multiple time-varying delays is proposed. An estimate of the convergence rate is also derived. Furthermore, a numerical example is given to illustrate our main results.

## Abstract The robust stability of discrete singular systems with time‐varying delay is considered. New delay‐dependent stability criteria are proposed, which are dependent on the minimum and maximum delay bounds. A strict delay‐dependent linear matrix inequality (LMI) condition is obtained for a